include/ceres/cubic_interpolation.h - ceres-solver - Git at Google

 // Ceres Solver - A fast non-linear least squares minimizer
 // Copyright 2015 Google Inc. All rights reserved.
 // http://ceres-solver.org/
 //
 // Redistribution and use in source and binary forms, with or without
 // modification, are permitted provided that the following conditions are met:
 //
 // * Redistributions of source code must retain the above copyright notice,
 //   this list of conditions and the following disclaimer.
 // * Redistributions in binary form must reproduce the above copyright notice,
 //   this list of conditions and the following disclaimer in the documentation
 //   and/or other materials provided with the distribution.
 // * Neither the name of Google Inc. nor the names of its contributors may be
 //   used to endorse or promote products derived from this software without
 //   specific prior written permission.
 //
 // THIS SOFTWARE IS PROVIDED BY THE COPYRIGHT HOLDERS AND CONTRIBUTORS "AS IS"
 // AND ANY EXPRESS OR IMPLIED WARRANTIES, INCLUDING, BUT NOT LIMITED TO, THE
 // IMPLIED WARRANTIES OF MERCHANTABILITY AND FITNESS FOR A PARTICULAR PURPOSE
 // ARE DISCLAIMED. IN NO EVENT SHALL THE COPYRIGHT OWNER OR CONTRIBUTORS BE
 // LIABLE FOR ANY DIRECT, INDIRECT, INCIDENTAL, SPECIAL, EXEMPLARY, OR
 // CONSEQUENTIAL DAMAGES (INCLUDING, BUT NOT LIMITED TO, PROCUREMENT OF
 // SUBSTITUTE GOODS OR SERVICES; LOSS OF USE, DATA, OR PROFITS; OR BUSINESS
 // INTERRUPTION) HOWEVER CAUSED AND ON ANY THEORY OF LIABILITY, WHETHER IN
 // CONTRACT, STRICT LIABILITY, OR TORT (INCLUDING NEGLIGENCE OR OTHERWISE)
 // ARISING IN ANY WAY OUT OF THE USE OF THIS SOFTWARE, EVEN IF ADVISED OF THE
 // POSSIBILITY OF SUCH DAMAGE.
 //
 // Author: sameeragarwal@google.com (Sameer Agarwal)

 #ifndef CERES_PUBLIC_CUBIC_INTERPOLATION_H_
 #define CERES_PUBLIC_CUBIC_INTERPOLATION_H_

 #include "ceres/internal/port.h"
 #include "Eigen/Core"
 #include "glog/logging.h"

 namespace ceres {

 // Given samples from a function sampled at four equally spaced points,
 //
 //   p0 = f(-1)
 //   p1 = f(0)
 //   p2 = f(1)
 //   p3 = f(2)
 //
 // Evaluate the cubic Hermite spline (also known as the Catmull-Rom
 // spline) at a point x that lies in the interval [0, 1].
 //
 // This is also the interpolation kernel (for the case of a = 0.5) as
 // proposed by R. Keys, in:
 //
 // "Cubic convolution interpolation for digital image processing".
 // IEEE Transactions on Acoustics, Speech, and Signal Processing
 // 29 (6): 1153–1160.
 //
 // For more details see
 //
 // http://en.wikipedia.org/wiki/Cubic_Hermite_spline
 // http://en.wikipedia.org/wiki/Bicubic_interpolation
 //
 // f if not NULL will contain the interpolated function values.
 // dfdx if not NULL will contain the interpolated derivative values.
 template <int kDataDimension>
 void CubicHermiteSpline(const Eigen::Matrix<double, kDataDimension, 1>& p0,
                         const Eigen::Matrix<double, kDataDimension, 1>& p1,
                         const Eigen::Matrix<double, kDataDimension, 1>& p2,
                         const Eigen::Matrix<double, kDataDimension, 1>& p3,
                         const double x,
                         double* f,
                         double* dfdx) {
   typedef Eigen::Matrix<double, kDataDimension, 1> VType;
   const VType a = 0.5 * (-p0 + 3.0 * p1 - 3.0 * p2 + p3);
   const VType b = 0.5 * (2.0 * p0 - 5.0 * p1 + 4.0 * p2 - p3);
   const VType c = 0.5 * (-p0 + p2);
   const VType d = p1;

   // Use Horner's rule to evaluate the function value and its
   // derivative.

   // f = ax^3 + bx^2 + cx + d
   if (f != NULL) {
     Eigen::Map<VType>(f, kDataDimension) = d + x * (c + x * (b + x * a));
   }

   // dfdx = 3ax^2 + 2bx + c
   if (dfdx != NULL) {
     Eigen::Map<VType>(dfdx, kDataDimension) = c + x * (2.0 * b + 3.0 * a * x);
   }
 }

 // Given as input an infinite one dimensional grid, which provides the
 // following interface.
 //
 //   class Grid {
 //    public:
 //     enum { DATA_DIMENSION = 2; };
 //     void GetValue(int n, double* f) const;
 //   };
 //
 // Here, GetValue gives the value of a function f (possibly vector
 // valued) for any integer n.
 //
 // The enum DATA_DIMENSION indicates the dimensionality of the
 // function being interpolated. For example if you are interpolating
 // rotations in axis-angle format over time, then DATA_DIMENSION = 3.
 //
 // CubicInterpolator uses cubic Hermite splines to produce a smooth
 // approximation to it that can be used to evaluate the f(x) and f'(x)
 // at any point on the real number line.
 //
 // For more details on cubic interpolation see
 //
 // http://en.wikipedia.org/wiki/Cubic_Hermite_spline
 //
 // Example usage:
 //
 //  const double data[] = {1.0, 2.0, 5.0, 6.0};
 //  Grid1D<double, 1> grid(x, 0, 4);
 //  CubicInterpolator<Grid1D<double, 1> > interpolator(grid);
 //  double f, dfdx;
 //  interpolator.Evaluator(1.5, &f, &dfdx);
 template<typename Grid>
 class CubicInterpolator {
  public:
   explicit CubicInterpolator(const Grid& grid)
       : grid_(grid) {
     // The + casts the enum into an int before doing the
     // comparison. It is needed to prevent
     // "-Wunnamed-type-template-args" related errors.
     CHECK_GE(+Grid::DATA_DIMENSION, 1);
   }

   void Evaluate(double x, double* f, double* dfdx) const {
     const int n = std::floor(x);
     Eigen::Matrix<double, Grid::DATA_DIMENSION, 1> p0, p1, p2, p3;
     grid_.GetValue(n - 1, p0.data());
     grid_.GetValue(n,     p1.data());
     grid_.GetValue(n + 1, p2.data());
     grid_.GetValue(n + 2, p3.data());
     CubicHermiteSpline<Grid::DATA_DIMENSION>(p0, p1, p2, p3, x - n, f, dfdx);
   }

   // The following two Evaluate overloads are needed for interfacing
   // with automatic differentiation. The first is for when a scalar
   // evaluation is done, and the second one is for when Jets are used.
   void Evaluate(const double& x, double* f) const {
     Evaluate(x, f, NULL);
   }

   template<typename JetT> void Evaluate(const JetT& x, JetT* f) const {
     double fx[Grid::DATA_DIMENSION], dfdx[Grid::DATA_DIMENSION];
     Evaluate(x.a, fx, dfdx);
     for (int i = 0; i < Grid::DATA_DIMENSION; ++i) {
       f[i].a = fx[i];
       f[i].v = dfdx[i] * x.v;
     }
   }

  private:
   const Grid& grid_;
 };

 // An object that implements an infinite one dimensional grid needed
 // by the CubicInterpolator where the source of the function values is
 // an array of type T on the interval
 //
 //   [begin, ..., end - 1]
 //
 // Since the input array is finite and the grid is infinite, values
 // outside this interval needs to be computed. Grid1D uses the value
 // from the nearest edge.
 //
 // The function being provided can be vector valued, in which case
 // kDataDimension > 1. The dimensional slices of the function maybe
 // interleaved, or they maybe stacked, i.e, if the function has
 // kDataDimension = 2, if kInterleaved = true, then it is stored as
 //
 //   f01, f02, f11, f12 ....
 //
 // and if kInterleaved = false, then it is stored as
 //
 //  f01, f11, .. fn1, f02, f12, .. , fn2
 //
 template <typename T,
           int kDataDimension = 1,
           bool kInterleaved = true>
 struct Grid1D {
  public:
   enum { DATA_DIMENSION = kDataDimension };

   Grid1D(const T* data, const int begin, const int end)
       : data_(data), begin_(begin), end_(end), num_values_(end - begin) {
     CHECK_LT(begin, end);
   }

   EIGEN_STRONG_INLINE void GetValue(const int n, double* f) const {
     const int idx = std::min(std::max(begin_, n), end_ - 1) - begin_;
     if (kInterleaved) {
       for (int i = 0; i < kDataDimension; ++i) {
         f[i] = static_cast<double>(data_[kDataDimension * idx + i]);
       }
     } else {
       for (int i = 0; i < kDataDimension; ++i) {
         f[i] = static_cast<double>(data_[i * num_values_ + idx]);
       }
     }
   }

  private:
   const T* data_;
   const int begin_;
   const int end_;
   const int num_values_;
 };

 // Given as input an infinite two dimensional grid like object, which
 // provides the following interface:
 //
 //   struct Grid {
 //     enum { DATA_DIMENSION = 1 };
 //     void GetValue(int row, int col, double* f) const;
 //   };
 //
 // Where, GetValue gives us the value of a function f (possibly vector
 // valued) for any pairs of integers (row, col), and the enum
 // DATA_DIMENSION indicates the dimensionality of the function being
 // interpolated. For example if you are interpolating a color image
 // with three channels (Red, Green & Blue), then DATA_DIMENSION = 3.
 //
 // BiCubicInterpolator uses the cubic convolution interpolation
 // algorithm of R. Keys, to produce a smooth approximation to it that
 // can be used to evaluate the f(r,c), df(r, c)/dr and df(r,c)/dc at
 // any point in the real plane.
 //
 // For more details on the algorithm used here see:
 //
 // "Cubic convolution interpolation for digital image processing".
 // Robert G. Keys, IEEE Trans. on Acoustics, Speech, and Signal
 // Processing 29 (6): 1153–1160, 1981.
 //
 // http://en.wikipedia.org/wiki/Cubic_Hermite_spline
 // http://en.wikipedia.org/wiki/Bicubic_interpolation
 //
 // Example usage:
 //
 // const double data[] = {1.0, 3.0, -1.0, 4.0,
 //                         3.6, 2.1,  4.2, 2.0,
 //                        2.0, 1.0,  3.1, 5.2};
 //  Grid2D<double, 1>  grid(data, 3, 4);
 //  BiCubicInterpolator<Grid2D<double, 1> > interpolator(grid);
 //  double f, dfdr, dfdc;
 //  interpolator.Evaluate(1.2, 2.5, &f, &dfdr, &dfdc);

 template<typename Grid>
 class BiCubicInterpolator {
  public:
   explicit BiCubicInterpolator(const Grid& grid)
       : grid_(grid) {
     // The + casts the enum into an int before doing the
     // comparison. It is needed to prevent
     // "-Wunnamed-type-template-args" related errors.
     CHECK_GE(+Grid::DATA_DIMENSION, 1);
   }

   // Evaluate the interpolated function value and/or its
   // derivative. Returns false if r or c is out of bounds.
   void Evaluate(double r, double c,
                 double* f, double* dfdr, double* dfdc) const {
     // BiCubic interpolation requires 16 values around the point being
     // evaluated.  We will use pij, to indicate the elements of the
     // 4x4 grid of values.
     //
     //          col
     //      p00 p01 p02 p03
     // row  p10 p11 p12 p13
     //      p20 p21 p22 p23
     //      p30 p31 p32 p33
     //
     // The point (r,c) being evaluated is assumed to lie in the square
     // defined by p11, p12, p22 and p21.

     const int row = std::floor(r);
     const int col = std::floor(c);

     Eigen::Matrix<double, Grid::DATA_DIMENSION, 1> p0, p1, p2, p3;

     // Interpolate along each of the four rows, evaluating the function
     // value and the horizontal derivative in each row.
     Eigen::Matrix<double, Grid::DATA_DIMENSION, 1> f0, f1, f2, f3;
     Eigen::Matrix<double, Grid::DATA_DIMENSION, 1> df0dc, df1dc, df2dc, df3dc;

     grid_.GetValue(row - 1, col - 1, p0.data());
     grid_.GetValue(row - 1, col    , p1.data());
     grid_.GetValue(row - 1, col + 1, p2.data());
     grid_.GetValue(row - 1, col + 2, p3.data());
     CubicHermiteSpline<Grid::DATA_DIMENSION>(p0, p1, p2, p3, c - col,
                                              f0.data(), df0dc.data());

     grid_.GetValue(row, col - 1, p0.data());
     grid_.GetValue(row, col    , p1.data());
     grid_.GetValue(row, col + 1, p2.data());
     grid_.GetValue(row, col + 2, p3.data());
     CubicHermiteSpline<Grid::DATA_DIMENSION>(p0, p1, p2, p3, c - col,
                                              f1.data(), df1dc.data());

     grid_.GetValue(row + 1, col - 1, p0.data());
     grid_.GetValue(row + 1, col    , p1.data());
     grid_.GetValue(row + 1, col + 1, p2.data());
     grid_.GetValue(row + 1, col + 2, p3.data());
     CubicHermiteSpline<Grid::DATA_DIMENSION>(p0, p1, p2, p3, c - col,
                                              f2.data(), df2dc.data());

     grid_.GetValue(row + 2, col - 1, p0.data());
     grid_.GetValue(row + 2, col    , p1.data());
     grid_.GetValue(row + 2, col + 1, p2.data());
     grid_.GetValue(row + 2, col + 2, p3.data());
     CubicHermiteSpline<Grid::DATA_DIMENSION>(p0, p1, p2, p3, c - col,
                                              f3.data(), df3dc.data());

     // Interpolate vertically the interpolated value from each row and
     // compute the derivative along the columns.
     CubicHermiteSpline<Grid::DATA_DIMENSION>(f0, f1, f2, f3, r - row, f, dfdr);
     if (dfdc != NULL) {
       // Interpolate vertically the derivative along the columns.
       CubicHermiteSpline<Grid::DATA_DIMENSION>(df0dc, df1dc, df2dc, df3dc,
                                                r - row, dfdc, NULL);
     }
   }

   // The following two Evaluate overloads are needed for interfacing
   // with automatic differentiation. The first is for when a scalar
   // evaluation is done, and the second one is for when Jets are used.
   void Evaluate(const double& r, const double& c, double* f) const {
     Evaluate(r, c, f, NULL, NULL);
   }

   template<typename JetT> void Evaluate(const JetT& r,
                                         const JetT& c,
                                         JetT* f) const {
     double frc[Grid::DATA_DIMENSION];
     double dfdr[Grid::DATA_DIMENSION];
     double dfdc[Grid::DATA_DIMENSION];
     Evaluate(r.a, c.a, frc, dfdr, dfdc);
     for (int i = 0; i < Grid::DATA_DIMENSION; ++i) {
       f[i].a = frc[i];
       f[i].v = dfdr[i] * r.v + dfdc[i] * c.v;
     }
   }

  private:
   const Grid& grid_;
 };

 // An object that implements an infinite two dimensional grid needed
 // by the BiCubicInterpolator where the source of the function values
 // is an grid of type T on the grid
 //
 //   [(row_start,   col_start), ..., (row_start,   col_end - 1)]
 //   [                          ...                            ]
 //   [(row_end - 1, col_start), ..., (row_end - 1, col_end - 1)]
 //
 // Since the input grid is finite and the grid is infinite, values
 // outside this interval needs to be computed. Grid2D uses the value
 // from the nearest edge.
 //
 // The function being provided can be vector valued, in which case
 // kDataDimension > 1. The data maybe stored in row or column major
 // format and the various dimensional slices of the function maybe
 // interleaved, or they maybe stacked, i.e, if the function has
 // kDataDimension = 2, is stored in row-major format and if
 // kInterleaved = true, then it is stored as
 //
 //   f001, f002, f011, f012, ...
 //
 // A commonly occuring example are color images (RGB) where the three
 // channels are stored interleaved.
 //
 // If kInterleaved = false, then it is stored as
 //
 //  f001, f011, ..., fnm1, f002, f012, ...
 template <typename T,
           int kDataDimension = 1,
           bool kRowMajor = true,
           bool kInterleaved = true>
 struct Grid2D {
  public:
   enum { DATA_DIMENSION = kDataDimension };

   Grid2D(const T* data,
          const int row_begin, const int row_end,
          const int col_begin, const int col_end)
       : data_(data),
         row_begin_(row_begin), row_end_(row_end),
         col_begin_(col_begin), col_end_(col_end),
         num_rows_(row_end - row_begin), num_cols_(col_end - col_begin),
         num_values_(num_rows_ * num_cols_) {
     CHECK_GE(kDataDimension, 1);
     CHECK_LT(row_begin, row_end);
     CHECK_LT(col_begin, col_end);
   }

   EIGEN_STRONG_INLINE void GetValue(const int r, const int c, double* f) const {
     const int row_idx =
         std::min(std::max(row_begin_, r), row_end_ - 1) - row_begin_;
     const int col_idx =
         std::min(std::max(col_begin_, c), col_end_ - 1) - col_begin_;

     const int n =
         (kRowMajor)
         ? num_cols_ * row_idx + col_idx
         : num_rows_ * col_idx + row_idx;


     if (kInterleaved) {
       for (int i = 0; i < kDataDimension; ++i) {
         f[i] = static_cast<double>(data_[kDataDimension * n + i]);
       }
     } else {
       for (int i = 0; i < kDataDimension; ++i) {
         f[i] = static_cast<double>(data_[i * num_values_ + n]);
       }
     }
   }

  private:
   const T* data_;
   const int row_begin_;
   const int row_end_;
   const int col_begin_;
   const int col_end_;
   const int num_rows_;
   const int num_cols_;
   const int num_values_;
 };

 }  // namespace ceres

 #endif  // CERES_PUBLIC_CUBIC_INTERPOLATOR_H_
	// Ceres Solver - A fast non-linear least squares minimizer
	// Copyright 2015 Google Inc. All rights reserved.
	// http://ceres-solver.org/
	//
	// Redistribution and use in source and binary forms, with or without
	// modification, are permitted provided that the following conditions are met:
	//
	// * Redistributions of source code must retain the above copyright notice,
	// this list of conditions and the following disclaimer.
	// * Redistributions in binary form must reproduce the above copyright notice,
	// this list of conditions and the following disclaimer in the documentation
	// and/or other materials provided with the distribution.
	// * Neither the name of Google Inc. nor the names of its contributors may be
	// used to endorse or promote products derived from this software without
	// specific prior written permission.
	//
	// THIS SOFTWARE IS PROVIDED BY THE COPYRIGHT HOLDERS AND CONTRIBUTORS "AS IS"
	// AND ANY EXPRESS OR IMPLIED WARRANTIES, INCLUDING, BUT NOT LIMITED TO, THE
	// IMPLIED WARRANTIES OF MERCHANTABILITY AND FITNESS FOR A PARTICULAR PURPOSE
	// ARE DISCLAIMED. IN NO EVENT SHALL THE COPYRIGHT OWNER OR CONTRIBUTORS BE
	// LIABLE FOR ANY DIRECT, INDIRECT, INCIDENTAL, SPECIAL, EXEMPLARY, OR
	// CONSEQUENTIAL DAMAGES (INCLUDING, BUT NOT LIMITED TO, PROCUREMENT OF
	// SUBSTITUTE GOODS OR SERVICES; LOSS OF USE, DATA, OR PROFITS; OR BUSINESS
	// INTERRUPTION) HOWEVER CAUSED AND ON ANY THEORY OF LIABILITY, WHETHER IN
	// CONTRACT, STRICT LIABILITY, OR TORT (INCLUDING NEGLIGENCE OR OTHERWISE)
	// ARISING IN ANY WAY OUT OF THE USE OF THIS SOFTWARE, EVEN IF ADVISED OF THE
	// POSSIBILITY OF SUCH DAMAGE.
	//
	// Author: sameeragarwal@google.com (Sameer Agarwal)

	#ifndef CERES_PUBLIC_CUBIC_INTERPOLATION_H_
	#define CERES_PUBLIC_CUBIC_INTERPOLATION_H_

	#include "ceres/internal/port.h"
	#include "Eigen/Core"
	#include "glog/logging.h"

	namespace ceres {

	// Given samples from a function sampled at four equally spaced points,
	//
	// p0 = f(-1)
	// p1 = f(0)
	// p2 = f(1)
	// p3 = f(2)
	//
	// Evaluate the cubic Hermite spline (also known as the Catmull-Rom
	// spline) at a point x that lies in the interval [0, 1].
	//
	// This is also the interpolation kernel (for the case of a = 0.5) as
	// proposed by R. Keys, in:
	//
	// "Cubic convolution interpolation for digital image processing".
	// IEEE Transactions on Acoustics, Speech, and Signal Processing
	// 29 (6): 1153–1160.
	//
	// For more details see
	//
	// http://en.wikipedia.org/wiki/Cubic_Hermite_spline
	// http://en.wikipedia.org/wiki/Bicubic_interpolation
	//
	// f if not NULL will contain the interpolated function values.
	// dfdx if not NULL will contain the interpolated derivative values.
	template <int kDataDimension>
	void CubicHermiteSpline(const Eigen::Matrix<double, kDataDimension, 1>& p0,
	const Eigen::Matrix<double, kDataDimension, 1>& p1,
	const Eigen::Matrix<double, kDataDimension, 1>& p2,
	const Eigen::Matrix<double, kDataDimension, 1>& p3,
	const double x,
	double* f,
	double* dfdx) {
	typedef Eigen::Matrix<double, kDataDimension, 1> VType;
	const VType a = 0.5 * (-p0 + 3.0 * p1 - 3.0 * p2 + p3);
	const VType b = 0.5 * (2.0 * p0 - 5.0 * p1 + 4.0 * p2 - p3);
	const VType c = 0.5 * (-p0 + p2);
	const VType d = p1;

	// Use Horner's rule to evaluate the function value and its
	// derivative.

	// f = ax^3 + bx^2 + cx + d
	if (f != NULL) {
	Eigen::Map<VType>(f, kDataDimension) = d + x * (c + x * (b + x * a));
	}

	// dfdx = 3ax^2 + 2bx + c
	if (dfdx != NULL) {
	Eigen::Map<VType>(dfdx, kDataDimension) = c + x * (2.0 * b + 3.0 * a * x);
	}
	}

	// Given as input an infinite one dimensional grid, which provides the
	// following interface.
	//
	// class Grid {
	// public:
	// enum { DATA_DIMENSION = 2; };
	// void GetValue(int n, double* f) const;
	// };
	//
	// Here, GetValue gives the value of a function f (possibly vector
	// valued) for any integer n.
	//
	// The enum DATA_DIMENSION indicates the dimensionality of the
	// function being interpolated. For example if you are interpolating
	// rotations in axis-angle format over time, then DATA_DIMENSION = 3.
	//
	// CubicInterpolator uses cubic Hermite splines to produce a smooth
	// approximation to it that can be used to evaluate the f(x) and f'(x)
	// at any point on the real number line.
	//
	// For more details on cubic interpolation see
	//
	// http://en.wikipedia.org/wiki/Cubic_Hermite_spline
	//
	// Example usage:
	//
	// const double data[] = {1.0, 2.0, 5.0, 6.0};
	// Grid1D<double, 1> grid(x, 0, 4);
	// CubicInterpolator<Grid1D<double, 1> > interpolator(grid);
	// double f, dfdx;
	// interpolator.Evaluator(1.5, &f, &dfdx);
	template<typename Grid>
	class CubicInterpolator {
	public:
	explicit CubicInterpolator(const Grid& grid)
	: grid_(grid) {
	// The + casts the enum into an int before doing the
	// comparison. It is needed to prevent
	// "-Wunnamed-type-template-args" related errors.
	CHECK_GE(+Grid::DATA_DIMENSION, 1);
	}

	void Evaluate(double x, double* f, double* dfdx) const {
	const int n = std::floor(x);
	Eigen::Matrix<double, Grid::DATA_DIMENSION, 1> p0, p1, p2, p3;
	grid_.GetValue(n - 1, p0.data());
	grid_.GetValue(n, p1.data());
	grid_.GetValue(n + 1, p2.data());
	grid_.GetValue(n + 2, p3.data());
	CubicHermiteSpline<Grid::DATA_DIMENSION>(p0, p1, p2, p3, x - n, f, dfdx);
	}

	// The following two Evaluate overloads are needed for interfacing
	// with automatic differentiation. The first is for when a scalar
	// evaluation is done, and the second one is for when Jets are used.
	void Evaluate(const double& x, double* f) const {
	Evaluate(x, f, NULL);
	}

	template<typename JetT> void Evaluate(const JetT& x, JetT* f) const {
	double fx[Grid::DATA_DIMENSION], dfdx[Grid::DATA_DIMENSION];
	Evaluate(x.a, fx, dfdx);
	for (int i = 0; i < Grid::DATA_DIMENSION; ++i) {
	f[i].a = fx[i];
	f[i].v = dfdx[i] * x.v;
	}
	}

	private:
	const Grid& grid_;
	};

	// An object that implements an infinite one dimensional grid needed
	// by the CubicInterpolator where the source of the function values is
	// an array of type T on the interval
	//
	// [begin, ..., end - 1]
	//
	// Since the input array is finite and the grid is infinite, values
	// outside this interval needs to be computed. Grid1D uses the value
	// from the nearest edge.
	//
	// The function being provided can be vector valued, in which case
	// kDataDimension > 1. The dimensional slices of the function maybe
	// interleaved, or they maybe stacked, i.e, if the function has
	// kDataDimension = 2, if kInterleaved = true, then it is stored as
	//
	// f01, f02, f11, f12 ....
	//
	// and if kInterleaved = false, then it is stored as
	//
	// f01, f11, .. fn1, f02, f12, .. , fn2
	//
	template <typename T,
	int kDataDimension = 1,
	bool kInterleaved = true>
	struct Grid1D {
	public:
	enum { DATA_DIMENSION = kDataDimension };

	Grid1D(const T* data, const int begin, const int end)
	: data_(data), begin_(begin), end_(end), num_values_(end - begin) {
	CHECK_LT(begin, end);
	}

	EIGEN_STRONG_INLINE void GetValue(const int n, double* f) const {
	const int idx = std::min(std::max(begin_, n), end_ - 1) - begin_;
	if (kInterleaved) {
	for (int i = 0; i < kDataDimension; ++i) {
	f[i] = static_cast<double>(data_[kDataDimension * idx + i]);
	}
	} else {
	for (int i = 0; i < kDataDimension; ++i) {
	f[i] = static_cast<double>(data_[i * num_values_ + idx]);
	}
	}
	}

	private:
	const T* data_;
	const int begin_;
	const int end_;
	const int num_values_;
	};

	// Given as input an infinite two dimensional grid like object, which
	// provides the following interface:
	//
	// struct Grid {
	// enum { DATA_DIMENSION = 1 };
	// void GetValue(int row, int col, double* f) const;
	// };
	//
	// Where, GetValue gives us the value of a function f (possibly vector
	// valued) for any pairs of integers (row, col), and the enum
	// DATA_DIMENSION indicates the dimensionality of the function being
	// interpolated. For example if you are interpolating a color image
	// with three channels (Red, Green & Blue), then DATA_DIMENSION = 3.
	//
	// BiCubicInterpolator uses the cubic convolution interpolation
	// algorithm of R. Keys, to produce a smooth approximation to it that
	// can be used to evaluate the f(r,c), df(r, c)/dr and df(r,c)/dc at
	// any point in the real plane.
	//
	// For more details on the algorithm used here see:
	//
	// "Cubic convolution interpolation for digital image processing".
	// Robert G. Keys, IEEE Trans. on Acoustics, Speech, and Signal
	// Processing 29 (6): 1153–1160, 1981.
	//
	// http://en.wikipedia.org/wiki/Cubic_Hermite_spline
	// http://en.wikipedia.org/wiki/Bicubic_interpolation
	//
	// Example usage:
	//
	// const double data[] = {1.0, 3.0, -1.0, 4.0,
	// 3.6, 2.1, 4.2, 2.0,
	// 2.0, 1.0, 3.1, 5.2};
	// Grid2D<double, 1> grid(data, 3, 4);
	// BiCubicInterpolator<Grid2D<double, 1> > interpolator(grid);
	// double f, dfdr, dfdc;
	// interpolator.Evaluate(1.2, 2.5, &f, &dfdr, &dfdc);

	template<typename Grid>
	class BiCubicInterpolator {
	public:
	explicit BiCubicInterpolator(const Grid& grid)
	: grid_(grid) {
	// The + casts the enum into an int before doing the
	// comparison. It is needed to prevent
	// "-Wunnamed-type-template-args" related errors.
	CHECK_GE(+Grid::DATA_DIMENSION, 1);
	}

	// Evaluate the interpolated function value and/or its
	// derivative. Returns false if r or c is out of bounds.
	void Evaluate(double r, double c,
	double* f, double* dfdr, double* dfdc) const {
	// BiCubic interpolation requires 16 values around the point being
	// evaluated. We will use pij, to indicate the elements of the
	// 4x4 grid of values.
	//
	// col
	// p00 p01 p02 p03
	// row p10 p11 p12 p13
	// p20 p21 p22 p23
	// p30 p31 p32 p33
	//
	// The point (r,c) being evaluated is assumed to lie in the square
	// defined by p11, p12, p22 and p21.

	const int row = std::floor(r);
	const int col = std::floor(c);

	Eigen::Matrix<double, Grid::DATA_DIMENSION, 1> p0, p1, p2, p3;

	// Interpolate along each of the four rows, evaluating the function
	// value and the horizontal derivative in each row.
	Eigen::Matrix<double, Grid::DATA_DIMENSION, 1> f0, f1, f2, f3;
	Eigen::Matrix<double, Grid::DATA_DIMENSION, 1> df0dc, df1dc, df2dc, df3dc;

	grid_.GetValue(row - 1, col - 1, p0.data());
	grid_.GetValue(row - 1, col , p1.data());
	grid_.GetValue(row - 1, col + 1, p2.data());
	grid_.GetValue(row - 1, col + 2, p3.data());
	CubicHermiteSpline<Grid::DATA_DIMENSION>(p0, p1, p2, p3, c - col,
	f0.data(), df0dc.data());

	grid_.GetValue(row, col - 1, p0.data());
	grid_.GetValue(row, col , p1.data());
	grid_.GetValue(row, col + 1, p2.data());
	grid_.GetValue(row, col + 2, p3.data());
	CubicHermiteSpline<Grid::DATA_DIMENSION>(p0, p1, p2, p3, c - col,
	f1.data(), df1dc.data());

	grid_.GetValue(row + 1, col - 1, p0.data());
	grid_.GetValue(row + 1, col , p1.data());
	grid_.GetValue(row + 1, col + 1, p2.data());
	grid_.GetValue(row + 1, col + 2, p3.data());
	CubicHermiteSpline<Grid::DATA_DIMENSION>(p0, p1, p2, p3, c - col,
	f2.data(), df2dc.data());

	grid_.GetValue(row + 2, col - 1, p0.data());
	grid_.GetValue(row + 2, col , p1.data());
	grid_.GetValue(row + 2, col + 1, p2.data());
	grid_.GetValue(row + 2, col + 2, p3.data());
	CubicHermiteSpline<Grid::DATA_DIMENSION>(p0, p1, p2, p3, c - col,
	f3.data(), df3dc.data());

	// Interpolate vertically the interpolated value from each row and
	// compute the derivative along the columns.
	CubicHermiteSpline<Grid::DATA_DIMENSION>(f0, f1, f2, f3, r - row, f, dfdr);
	if (dfdc != NULL) {
	// Interpolate vertically the derivative along the columns.
	CubicHermiteSpline<Grid::DATA_DIMENSION>(df0dc, df1dc, df2dc, df3dc,
	r - row, dfdc, NULL);
	}
	}

	// The following two Evaluate overloads are needed for interfacing
	// with automatic differentiation. The first is for when a scalar
	// evaluation is done, and the second one is for when Jets are used.
	void Evaluate(const double& r, const double& c, double* f) const {
	Evaluate(r, c, f, NULL, NULL);
	}

	template<typename JetT> void Evaluate(const JetT& r,
	const JetT& c,
	JetT* f) const {
	double frc[Grid::DATA_DIMENSION];
	double dfdr[Grid::DATA_DIMENSION];
	double dfdc[Grid::DATA_DIMENSION];
	Evaluate(r.a, c.a, frc, dfdr, dfdc);
	for (int i = 0; i < Grid::DATA_DIMENSION; ++i) {
	f[i].a = frc[i];
	f[i].v = dfdr[i] * r.v + dfdc[i] * c.v;
	}
	}

	private:
	const Grid& grid_;
	};

	// An object that implements an infinite two dimensional grid needed
	// by the BiCubicInterpolator where the source of the function values
	// is an grid of type T on the grid
	//
	// [(row_start, col_start), ..., (row_start, col_end - 1)]
	// [ ... ]
	// [(row_end - 1, col_start), ..., (row_end - 1, col_end - 1)]
	//
	// Since the input grid is finite and the grid is infinite, values
	// outside this interval needs to be computed. Grid2D uses the value
	// from the nearest edge.
	//
	// The function being provided can be vector valued, in which case
	// kDataDimension > 1. The data maybe stored in row or column major
	// format and the various dimensional slices of the function maybe
	// interleaved, or they maybe stacked, i.e, if the function has
	// kDataDimension = 2, is stored in row-major format and if
	// kInterleaved = true, then it is stored as
	//
	// f001, f002, f011, f012, ...
	//
	// A commonly occuring example are color images (RGB) where the three
	// channels are stored interleaved.
	//
	// If kInterleaved = false, then it is stored as
	//
	// f001, f011, ..., fnm1, f002, f012, ...
	template <typename T,
	int kDataDimension = 1,
	bool kRowMajor = true,
	bool kInterleaved = true>
	struct Grid2D {
	public:
	enum { DATA_DIMENSION = kDataDimension };

	Grid2D(const T* data,
	const int row_begin, const int row_end,
	const int col_begin, const int col_end)
	: data_(data),
	row_begin_(row_begin), row_end_(row_end),
	col_begin_(col_begin), col_end_(col_end),
	num_rows_(row_end - row_begin), num_cols_(col_end - col_begin),
	num_values_(num_rows_ * num_cols_) {
	CHECK_GE(kDataDimension, 1);
	CHECK_LT(row_begin, row_end);
	CHECK_LT(col_begin, col_end);
	}

	EIGEN_STRONG_INLINE void GetValue(const int r, const int c, double* f) const {
	const int row_idx =
	std::min(std::max(row_begin_, r), row_end_ - 1) - row_begin_;
	const int col_idx =
	std::min(std::max(col_begin_, c), col_end_ - 1) - col_begin_;

	const int n =
	(kRowMajor)
	? num_cols_ * row_idx + col_idx
	: num_rows_ * col_idx + row_idx;


	if (kInterleaved) {
	for (int i = 0; i < kDataDimension; ++i) {
	f[i] = static_cast<double>(data_[kDataDimension * n + i]);
	}
	} else {
	for (int i = 0; i < kDataDimension; ++i) {
	f[i] = static_cast<double>(data_[i * num_values_ + n]);
	}
	}
	}

	private:
	const T* data_;
	const int row_begin_;
	const int row_end_;
	const int col_begin_;
	const int col_end_;
	const int num_rows_;
	const int num_cols_;
	const int num_values_;
	};

	} // namespace ceres

	#endif // CERES_PUBLIC_CUBIC_INTERPOLATOR_H_